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\begin{document}
La soluci\'{o}n de la ecuaci\'{o}n $\dfrac{5}{2}x+\dfrac{1}{7}=-\dfrac{1}%
{5}x+1$ es:\newline\qquad a) $x=\dfrac{20}{63}\qquad\qquad$b) $x=\dfrac
{20}{67}\qquad\qquad$c) $x=\dfrac{10}{26}\qquad\qquad$d) $x=\dfrac{10}{63}$

La soluci\'{o}n de la ecuaci\'{o}n $\dfrac{5}{3}x+\dfrac{1}{2}=-\dfrac{1}%
{3}x+1$ es:\newline\qquad a) $x=\dfrac{1}{4}\qquad\qquad$b) $x=\dfrac{1}%
{2}\qquad\qquad$c) $x=-\dfrac{1}{4}\qquad\qquad$d) $x=-\dfrac{1}{2}$

La soluci\'{o}n de la ecuaci\'{o}n $\dfrac{3}{7}x+\dfrac{1}{4}=-x+2$
es:\newline\qquad a) $x=\dfrac{49}{40}\qquad\qquad$b) $x=\dfrac{40}{49}%
\qquad\qquad$c) $x=-\dfrac{49}{40}\qquad\qquad$d) $x=-\dfrac{40}{49}$

La soluci\'{o}n de la ecuaci\'{o}n $\dfrac{4}{3}x+\dfrac{3}{2}=-\dfrac{4}%
{9}x-1$ es:\newline\qquad a) $x=-\dfrac{45}{32}\qquad\qquad$b) $x=\dfrac
{45}{32}\qquad\qquad$c) $x=\dfrac{32}{45}\qquad\qquad$d) $x=-\dfrac{32}{45}$

La soluci\'{o}n de la ecuaci\'{o}n $\dfrac{1}{8}x+\dfrac{2}{7}=-\dfrac{1}%
{10}x+1$ es:\newline\qquad a) $x=\dfrac{200}{63}\qquad\qquad$b) $x=-\dfrac
{200}{63}\qquad\qquad$c) $x=\dfrac{100}{36}\qquad\qquad$d) $x=-\dfrac{100}%
{63}$

La soluci\'{o}n de la ecuaci\'{o}n $\dfrac{1}{2}x+\dfrac{1}{10}=-\dfrac{1}%
{3}x+3$ es:\newline\qquad a) $x=\frac{87}{25}$ $\qquad$\qquad b) $x=\dfrac
{25}{87}$\qquad c) $x=-\dfrac{25}{87}$\qquad d) $x=-\frac{87}{25}$

La soluci\'{o}n de la ecuaci\'{o}n $\dfrac{2}{5}x+\dfrac{2}{3}=\dfrac{1}%
{10}x+1$ es:\newline\qquad a) $x=-\dfrac{9}{10}\qquad$\qquad b) $x=\dfrac
{10}{9}$\qquad c) $x=\dfrac{9}{10}$\qquad d) $x=-\dfrac{10}{9}$

La soluci\'{o}n de la ecuaci\'{o}n $\dfrac{3}{5}x+\dfrac{1}{10}=-\dfrac{1}%
{9}x+4$ es:\newline\qquad a) $x=\dfrac{351}{64}\qquad$\qquad b) $x=\dfrac
{64}{351}$\qquad c) $x=-\dfrac{64}{351}$\qquad d) $x=-\dfrac{351}{64}$

La soluci\'{o}n de la ecuaci\'{o}n $\dfrac{1}{5}x+\dfrac{1}{3}=-\dfrac{1}%
{2}x+3$ es:\newline\qquad a) $x=\dfrac{80}{21}\qquad$\qquad b) $x=\dfrac
{21}{80}$\qquad c) $x=-\dfrac{80}{21}$\qquad d) $x=-\dfrac{21}{80}$

La soluci\'{o}n de la ecuaci\'{o}n $\dfrac{3}{2}x+\dfrac{1}{4}=\dfrac{1}%
{5}x+1$ es:\newline\qquad a) $x=\dfrac{15}{26}\qquad$\qquad b) $x=-\dfrac
{26}{15}$\qquad c) $x=\dfrac{26}{15}$\qquad d) $x=-\dfrac{15}{26}$

La soluci\'{o}n de la ecuaci\'{o}n $\dfrac{2}{9}x+\dfrac{1}{7}=\dfrac{1}%
{3}x-1$ es:\newline\qquad a) $x=\dfrac{72}{7}\qquad$\qquad b) $x=\dfrac{7}%
{72}$\qquad c) $x=-\dfrac{7}{72}$\qquad d) $x=-\dfrac{72}{7}$

La soluci\'{o}n de la ecuaci\'{o}n $\dfrac{3}{8}x-\dfrac{1}{2}=\dfrac{1}%
{5}x-3$ es:\newline\qquad a) $x=-\dfrac{100}{7}$\qquad b) $x=-\dfrac{7}{100}%
$\qquad c) $x=\dfrac{7}{100}$\qquad d) $x=\dfrac{100}{7}$

La soluci\'{o}n de la ecuaci\'{o}n $\dfrac{7}{9}x-\dfrac{2}{3}=\dfrac{1}%
{5}x+5$ es:\newline\qquad a) $x=\dfrac{255}{26}\qquad$\qquad b) $x=\dfrac
{26}{255}$\qquad c) $x=-\dfrac{26}{255}$\qquad d) $x=-\dfrac{255}{26}$

La soluci\'{o}n de la ecuaci\'{o}n $\dfrac{3}{10}x-\dfrac{1}{3}=\dfrac{1}%
{5}x-5$ es:\newline\qquad a) $x=-\dfrac{140}{3}\qquad$\qquad b) $x=-\dfrac
{140}{3}$\qquad c) $x=\dfrac{3}{140}$\qquad d) $x=\dfrac{140}{3}$

La soluci\'{o}n de la ecuaci\'{o}n $\dfrac{5}{8}x-\dfrac{1}{3}=\dfrac{1}%
{9}x+3$ es:\newline\qquad a) $x=\dfrac{240}{37}\qquad$\qquad b) $x=-\dfrac
{240}{37}$\qquad c) $x=\dfrac{37}{240}$\qquad d) $x=-\dfrac{37}{240}$


\end{document}